Analytical solution of the fractional linear time-delay systems and their Ulam-Hyers stability
Abstract
We introduce the delayed Mittag-Leffler type matrix functions, delayed fractional cosine, delayed fractional sine and use the Laplace transform to obtain an analytical solution to the IVP for a Hilfer type fractional linear time-delay system D0,tμ,z( t) +Az( t) + z( t-h) =f( t) of order 1<μ<2 and type 0≤≤1, with nonpermutable matrices A and . Moreover, we study Ulam-Hyers stability of the Hilfer type fractional linear time-delay system. Obtained results extend those for Caputo and Riemann-Liouville type fractional linear time-delay systems and new even for these fractional delay systems.
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